Cutoff in the Bernoulli-Laplace model with O(n) swaps

Abstract

This paper considers the (n,k)-Bernoulli--Laplace model in the case when there are two urns, the total number of red and white balls is the same, and the number of selections k at each step is on the same asymptotic order as the number of balls n in each urn. Our main focus is on the large-time behavior of the corresponding Markov chain tracking the number of red balls in a given urn. Under reasonable assumptions on the asymptotic behavior of the ratio k/n as n→ ∞, cutoff in the total variation distance is established. A cutoff window is also provided. These results, in particular, partially resolve an open problem posed by Eskenazis and Nestoridi.